A friend presented me with a conjecture that seems to be true but neither of us can come up with a proof. Here's the problem:

Given a connected, bipartite graph with disjoint non-empty vertex sets U and V, such that |U|<|V|, all vertices are in either U or V, and there are no edges connecting two vertices within the same set, then there exists at least one edge which connects vertices a∈U and b∈V such that degree(a)>degree(b)

It's trivial to prove that there is at least one vertex in U with degree higher than one in V, but to prove that a pair exists *with an edge connecting them* is stumping us.